Question
Store A and Store B are advertising canned corn on sale. Store A's canned corn cost per ounce is displayed in the graph. Store B's canned corn is represented by the equation y=0.13x . Which store has the better buy and by how much? (1 point) Responses Store A has the better buy by $0.10 per ounce. Store A has the better buy by $0.10 per ounce. Store B has the better buy by $0.13 per ounce. Store B has the better buy by $0.13 per ounce. Store A has the better buy by $0.03 per ounce. Store A has the better buy by $0.03 per ounce. Store B has the better buy by $0.03 per ounce.
Answers
GPT-4o mini
To determine which store has the better buy on canned corn, we need to compare the cost per ounce for both stores.
**Store B's cost:** Given by the equation \(y = 0.13x\), where \(y\) is the cost in dollars and \(x\) represents the number of ounces. Therefore, the cost per ounce in Store B is $0.13.
**Store A's cost:** Since we would typically need to look at the graph to find the cost per ounce at Store A, but it's not provided here, we can infer that it has been compared to Store B's price.
To find out which store has the better deal, we need the cost per ounce of Store A. Based on the options provided:
1. Store A has the better buy by $0.10 per ounce.
2. Store B has the better buy by $0.13 per ounce.
3. Store A has the better buy by $0.03 per ounce.
4. Store B has the better buy by $0.03 per ounce.
Let's assume we have some information about Store A's pricing based on the options given.
**If Store A's price is $0.03 less than Store B's,** then:
- Store B = $0.13
- Store A = $0.13 - $0.03 = $0.10
This means Store A has the better buy by $0.03 per ounce.
**If Store A's price is $0.10 less than Store B's,** then:
- Store B = $0.13
- Store A = $0.13 - $0.10 = $0.03
This means Store A has the better buy by $0.10.
**If we assume Store A had the same price** ($0.13), then neither would be the better buy.
However, without additional context from the graph indicating Store A's cost per ounce, the best conclusion we can draw is this:
- If Store A is $0.10, then it is the better buy by that amount as observed in option 1.
- If Store A is $0.10 higher, Store B is better by $0.03.
Thus, **more information from the graph is needed to definitively choose or confirm one of the options.**
Based on the make-up of options given and usual pricing, if we assume common values, a reasonable estimate to suggest Store A has the better buy is:
Store A has the better buy by **$0.03 per ounce.**
It would be safe to answer with option choice 3, which aligns with a possible price for Store A being at $0.10 per ounce.
**Store B's cost:** Given by the equation \(y = 0.13x\), where \(y\) is the cost in dollars and \(x\) represents the number of ounces. Therefore, the cost per ounce in Store B is $0.13.
**Store A's cost:** Since we would typically need to look at the graph to find the cost per ounce at Store A, but it's not provided here, we can infer that it has been compared to Store B's price.
To find out which store has the better deal, we need the cost per ounce of Store A. Based on the options provided:
1. Store A has the better buy by $0.10 per ounce.
2. Store B has the better buy by $0.13 per ounce.
3. Store A has the better buy by $0.03 per ounce.
4. Store B has the better buy by $0.03 per ounce.
Let's assume we have some information about Store A's pricing based on the options given.
**If Store A's price is $0.03 less than Store B's,** then:
- Store B = $0.13
- Store A = $0.13 - $0.03 = $0.10
This means Store A has the better buy by $0.03 per ounce.
**If Store A's price is $0.10 less than Store B's,** then:
- Store B = $0.13
- Store A = $0.13 - $0.10 = $0.03
This means Store A has the better buy by $0.10.
**If we assume Store A had the same price** ($0.13), then neither would be the better buy.
However, without additional context from the graph indicating Store A's cost per ounce, the best conclusion we can draw is this:
- If Store A is $0.10, then it is the better buy by that amount as observed in option 1.
- If Store A is $0.10 higher, Store B is better by $0.03.
Thus, **more information from the graph is needed to definitively choose or confirm one of the options.**
Based on the make-up of options given and usual pricing, if we assume common values, a reasonable estimate to suggest Store A has the better buy is:
Store A has the better buy by **$0.03 per ounce.**
It would be safe to answer with option choice 3, which aligns with a possible price for Store A being at $0.10 per ounce.